Modelling the Grid-like Encoding of Visual Space in Primates

Jochen Kerdels and Gabriele Peters

University of Hagen, Universit

atsstrasse 1, D-58097 Hagen, Germany

Keywords:

Recursive Growing Neural Gas, Entorhinal Cortex, Primates, Grid-like Encoding, Grid Cell Model.

Abstract:

Several regions of the mammalian brain contain neurons that exhibit grid-like ﬁring patterns. The most promi-

nent example of such neurons are grid cells in the entorhinal cortex (EC) whose activity correlates with the

animal’s location. Correspondingly, contemporary models of grid cells interpret this ﬁring behavior as a spe-

cialized, functional part within a system for orientation and navigation. However, Killian et al. report on

neurons in the primate EC that show similar, grid-like ﬁring patterns but encode gaze-positions in the ﬁeld of

view instead of locations in the environment. We hypothesized that the phenomenon of grid-like ﬁring pat-

terns may not be restricted to navigational tasks and may be related to a more general, underlying information

processing scheme. To explore this idea, we developed a grid cell model based on the recursive growing neural

gas (RGNG) algorithm that expresses this notion. Here we show that our grid cell model can – in contrast

to established grid cell models – also describe the observations of Killian et al. and we outline the general

conditions under which we would expect neurons to exhibit grid-like activity patterns in response to input

signals independent of a presumed, functional task of the neurons.

1 INTRODUCTION

Within the last decade neurons with grid-like ﬁring

patterns were identiﬁed in several regions of the mam-

malian brain. Among these the so-called grid cells

are most prominent. Their ﬁring pattern correlates

with the animal’s location resulting in a periodic, tri-

angular lattice of ﬁring ﬁelds that cover the animal’s

environment. Grid cells were ﬁrst discovered in the

entorhinal cortex of rats (Fyhn et al., 2004; Haft-

ing et al., 2005), and could later be shown to ex-

ist in mice (Domnisoru et al., 2013), bats (Yartsev

et al., 2011), and humans (Jacobs et al., 2013) as well.

Besides the entorhinal cortex (rats, mice, bats, hu-

mans), grid cells were also found in the pre- and para-

subiculum (rats) (Boccara et al., 2010), and the hip-

pocampus, parahippocampal gyrus, amygdala, cingu-

late cortex, and frontal cortex (humans) (Jacobs et al.,

2013), albeit in low numbers. In all reported cases

the observed ﬁring patterns correlated with the ani-

mal’s location

. However, Killian et al. (Killian et al.,

2012) observed neurons with grid-like ﬁring patterns

in the entorhinal cortex of primates that show a differ-

ent behavior. Instead of encoding positions in phys-

ical space the observed neurons encoded the visual

In some cases the subjects navigated a virtual environ-

ment (Domnisoru et al., 2013; Jacobs et al., 2013).

space of the animal with a grid-like pattern, i.e., the

activity of the neurons correlated with gaze-positions

in the animal’s ﬁeld of view.

These observations suggests that grid-like neu-

ronal activity may be a phenomenon that is more

widespread and may represent a more general form

of information processing as assumed so far. Existing

computational models of grid cells (Moser and Moser,

2008; Welinder et al., 2008; Giocomo et al., 2011;

Barry and Burgess, 2014; Burak, 2014; Moser et al.,

2014) are based on priors that restrict their applica-

bility to the domain of path integration and naviga-

tion. Thus, to explore the hypothesis stated above we

developed a novel computational model based on the

recursive growing neural gas (RGNG) algorithm that

describes the behavior of neurons with grid-like activ-

ities without relying on priors that would restrict the

model to a single domain (Kerdels and Peters, 2013;

Kerdels and Peters, 2015b; Kerdels, 2016). Here we

show that our model is able to describe not only typi-

cal grid cells but also cells with similar grid-like ﬁring

patterns that operate in different domains like the neu-

rons observed by Killian et al. (Killian et al., 2012).

The next section summarizes our RGNG-based

model and outlines the general conditions under

which the model’s neurons exhibit grid-like ﬁring pat-

terns. Based on these conditions, a possible input sig-

Kerdels, J. and Peters, G.

Modelling the Grid-like Encoding of Visual Space in Primates.

DOI: 10.5220/0006045500420049

In Proceedings of the 8th International Joint Conference on Computational Intelligence (IJCCI 2016) - Volume 3: NCTA, pages 42-49

ISBN: 978-989-758-201-1

nal that may underlie the phenomena reported by Kil-

lian et al. is described in section 3. Simulation results

demonstrating that such a signal can indeed cause the

observed grid-like ﬁring patterns are presented in sec-

tion 4. Finally, conclusions reﬂecting on the results

are given in section 5.

2 GRID CELL MODEL

The majority of conventional grid cell models rely on

mechanisms that directly integrate information on the

velocity and direction of an animal into a periodic rep-

resentation of the animal’s location (Kerdels, 2016).

As a consequence, the particular models do not gen-

eralize well, i.e., they can not be used to describe or

investigate the behavior of neurons that receive other

kinds of input signals but may also exhibit grid-like

ﬁring patterns. In contrast, the RGNG-based model

does not rely on speciﬁc types of information as input.

It describes the general behavior of a group of neurons

in response to inputs from arbitrary input spaces.

The main hypothesis of our RGNG-based model

is that the behavior observed in grid cells is just one

instance of a more general information processing

scheme. In this scheme each cell in a group of neu-

rons tries to learn the structure of its entire input space

while being in competition with its peers. Learn-

ing the input space structure is modelled on a per-

cell level with a growing neural gas – an unsuper-

vised learning algorithm that approximates the input

space structure with a network of units (Martinetz and

Schulten, 1994; Fritzke, 1995). Each unit in this net-

work is associated with a reference vector or proto-

type that represents a speciﬁc location in input space.

The network structure reﬂects the input space topol-

ogy, i.e., neighboring units in the network correspond

to neighboring regions of input space.

Interestingly, the competition between neurons

can be described by the same GNG dynamics as the

per-cell learning process resulting in a joint, recur-

sive model that describes both the learning processes

within each cell as well as the competition within a

group of neurons. At the model’s core lies the recur-

sive growing neural gas (RGNG) algorithm, which is

described formally in the next section. It represents

a generalization of the original GNG algorithm that

allows the unit’s prototypes to be entire GNGs them-

selves.

2.1 Recursive Growing Neural Gas

The recursive growing neural gas (RGNG) has essen-

tially the same structure as a regular GNG. Like a

GNG an RGNG g can be described by a tuple

g := (U,C, θ) ∈ G,

with a set U of units, a set C of edges, and a set θ of

parameters. Each unit u is described by a tuple:

u := (w, e) ∈ U, w ∈ W := R

∪ G, e ∈ R,

with the prototype w, and the accumulated error e.

Note that in contrast to the regular GNG the proto-

type w of an RGNG unit can either be a n-dimensional

vector or another RGNG. Each edge c is described by

a tuple:

c := (V, t) ∈ C, V ⊆ U ∧ |V | = 2, t ∈ N,

with the units v ∈ V connected by the edge and the

age t of the edge. The direct neighborhood E

of a

unit u ∈ U is deﬁned as:

{

k|∃ (V, t) ∈ C, V =

{

u, k

}

, t ∈ N

}

The set θ of parameters consists of:

θ :=

{

, ε

, λ, τ, α, β, M

}

Compared to the regular GNG the set of parameters

has grown by θε

and θM. The former parameter is

a third learning rate used in the adaptation function

A (see below). The latter parameter is the maximum

number of units in an RGNG. This number refers

only to the number of “direct” units in a particular

RGNG and does not include potential units present in

RGNGs that are prototypes of these direct units.

Like its structure the behavior of the RGNG is ba-

sically identical to that of a regular GNG. However,

since the prototypes of the units can either be vectors

or RGNGs themselves, the behavior is now deﬁned

by four functions. The distance function

D(x, y) : W ×W → R

determines the distance either between two vectors,

two RGNGs, or a vector and an RGNG. The interpo-

lation function

I(x, y) : (R

× R

) ∪ (G × G) → W

generates a new vector or new RGNG by interpolat-

ing between two vectors or two RGNGs, respectively.

The adaptation function

A(x, ξ, r) : W × R

× R → W

adapts either a vector or RGNG towards the input vec-

tor ξ by a given fraction r. Finally, the input function

F(g, ξ) : G × R

→ G × R

feeds an input vector ξ into the RGNG g and returns

the modiﬁed RGNG as well as the distance between ξ

and the best matching unit (BMU, see below) of g.

The input function F contains the core of the RGNG’s

behavior and utilizes the other three functions, but is

also used, in turn, by those functions introducing sev-

eral recursive paths to the program ﬂow.

The notation gα is used to reference the element α

within the tuple.

Modelling the Grid-like Encoding of Visual Space in Primates

F(g, ξ): The input function F is a generalized ver-

sion of the original GNG algorithm that facilitates the

use of prototypes other than vectors. In particular, it

allows to use RGNGs themselves as prototypes result-

ing in a recursive structure. An input ξ ∈ R

to the

RGNG g is processed by the input function F as fol-

lows:

• Find the two units s

and s

with the smallest dis-

tance to the input ξ according to the distance func-

tion D:

:= arg min

u∈gU

D(uw, ξ) ,

:= arg min

u∈gU\

{

}

D(uw, ξ) .

• Increment the age of all edges connected to s

∆ct = 1, c ∈ gC ∧ s

∈ cV .

• If no edge between s

and s

exists, create one:

gC ⇐ gC ∪

{

(

{

, s

}

, 0)

}

• Reset the age of the edge between s

and s

zero:

ct ⇐ 0, c ∈ gC ∧ s

, s

∈ cV .

• Add the squared distance between ξ and the pro-

totype of s

to the accumulated error of s

∆s

e = D(s

w, ξ)

• Adapt the prototype of s

and all prototypes of its

direct neighbors:

w ⇐ A(s

w, ξ, gθε

w ⇐ A(s

w, ξ, gθε

), ∀s

∈ E

• Remove all edges with an age above a given

threshold τ and remove all units that no longer

have any edges connected to them:

gC ⇐ gC \

{

c|c ∈ gC ∧ ct > gθτ

}

gU ⇐ gU \

{

u|u ∈ gU ∧ E

}

• If an integer-multiple of gθλ inputs was pre-

sented to the RGNG g and |gU | < gθM, add a

new unit u. The new unit is inserted “between” the

unit j with the largest accumulated error and the

unit k with the largest accumulated error among

the direct neighbors of j. Thus, the prototype uw

of the new unit is initialized as:

uw := I( jw, kw) , j = argmax

l∈gU

(le) ,

k = argmax

l∈E

(le) .

The existing edge between units j and k is re-

moved and edges between units j and u as well

as units u and k are added:

gC ⇐ gC \

{

c|c ∈ gC ∧ j, k ∈ cV

}

gC ⇐ gC ∪

{

(

{

j, u

}

, 0), (

{

u, k

}

, 0)

}

The accumulated errors of units j and k are de-

creased and the accumulated error ue of the new

unit is set to the decreased accumulated error of

unit j:

∆ je = −gθα· je, ∆ke = −gθα · ke,

ue := je .

• Finally, decrease the accumulated error of all

units:

∆ue = −gθβ · ue, ∀u ∈ gU .

The function F returns the tuple (g, d

min

) containing

the now updated RGNG g and the distance d

min

D(s

w, ξ) between the prototype of unit s

and in-

put ξ. Note that in contrast to the regular GNG there

is no stopping criterion any more, i.e., the RGNG op-

erates explicitly in an online fashion by continuously

integrating new inputs. To prevent unbounded growth

of the RGNG the maximum number of units θM was

introduced to the set of parameters.

D(x, y): The distance function D determines the dis-

tance between two prototypes x and y. The calculation

of the actual distance depends on whether x and y are

both vectors, a combination of vector and RGNG, or

both RGNGs:

D(x, y) :=











(x, y) if x, y ∈ R

(x, y) if x ∈ G ∧ y ∈ R

(x, y) if x ∈ R

∧ y ∈ G,

(x, y) if x, y ∈ G.

In case the arguments of D are both vectors, the

Minkowski distance is used:

(x, y) := (

∑

i=1

− y

)

, x = (x

, . . . , x

y = (y

, . . . , y

p ∈ N.

Using the Minkowski distance instead of the Eu-

clidean distance allows to adjust the distance measure

with respect to certain types of inputs via the param-

eter p. For example, setting p to higher values results

in an emphasis of large changes in individual dimen-

sions of the input vector versus changes that are dis-

tributed over many dimensions (Kerdels and Peters,

2015a). However, in the case of modeling the behav-

ior of grid cells the parameter is set to a ﬁxed value

of 2 which makes the Minkowski distance equivalent

to the Euclidean distance. The latter is required in

this context as only the Euclidean distance allows the

GNG to form an induced Delaunay triangulation of

its input space.

NCTA 2016 - 8th International Conference on Neural Computation Theory and Applications

In case the arguments of D are a combination of

vector and RGNG, the vector is fed into the RGNG

using function F and the returned minimum distance

is taken as distance value:

(x, y) := F(x, y)d

min

(x, y) := D

(y, x).

In case the arguments of D are both RGNGs, the dis-

tance is deﬁned to be the pairwise minimum distance

between the prototypes of the RGNGs’ units, i.e., sin-

gle linkage distance between the sets of units is used:

(x, y) := min

u∈xU, k∈yU

D(uw, kw).

The latter case is used by the interpolation function

if the recursive depth of an RGNG is at least 2. As

the RGNG-based grid cell model has only a recursive

depth of 1 (see next section), the case is considered

for reasons of completeness rather than necessity. Al-

ternative measures to consider could be, e.g., average

or complete linkage.

I(x, y): The interpolation function I returns a new

prototype as a result from interpolating between the

prototypes x and y. The type of interpolation depends

on whether the arguments are both vectors or both

RGNGs:

I(x, y) :=

(

(x, y) if x, y ∈ R

(x, y) if x, y ∈ G.

In case the arguments of I are both vectors, the result-

ing prototype is the arithmetic mean of the arguments:

(x, y) :=

x + y

In case the arguments of I are both RGNGs, the result-

ing prototype is a new RGNG a. Assuming w.l.o.g.

that |xU| ≥ |yU | the components of the interpolated

RGNG a are deﬁned as follows:

a := I(x, y),

aU :=











(w, 0)



w = I(uw, kw),

∀u ∈ xU,

k = argmin

l∈yU

D(uw, lw)











aC :=











(

{

l, m

}

, 0)



∃c ∈ xC

∧ u, k ∈ cV

∧ lw = I(uw, ·)

∧ mw = I(kw, ·)











aθ := xθ .

The resulting RGNG a has the same number of units

as RGNG x. Each unit of a has a prototype that was

Figure 1: Illustration of the RGNG-based neuron model.

The top layer is represented by three units (red, green, blue)

connected by dashed edges. The prototypes of the top layer

units are themselves RGNGs. The units of these RGNGs

are illustrated in the second layer by corresponding colors.

interpolated between the prototype of the correspond-

ing unit in x and the nearest prototype found in the

units of y. The edges and parameters of a correspond

to the edges and parameters of x.

A(x, ξ, r): The adaptation function A adapts a proto-

type x towards a vector ξ by a given fraction r. The

type of adaptation depends on whether the given pro-

totype is a vector or an RGNG:

A(x, ξ, r) :=

(

(x, ξ, r) if x ∈ R

(x, ξ, r) if x ∈ G.

In case prototype x is a vector, the adaptation is per-

formed as linear interpolation:

(x, ξ, r) := (1 − r)x + r ξ.

In case prototype x is an RGNG, the adaptation is per-

formed by feeding ξ into the RGNG. Importantly, the

parameters ε

and ε

of the RGNG are temporarily

changed to take the fraction r into account:

∗

:= ( r, r · xθε

, xθε

, xθλ, xθτ,

xθα, xθβ, xθM),

∗

:= (xU, xC, θ

∗

(x, ξ, r) := F(x

∗

, ξ)x .

Note that in this case the new parameter θε

is used

to derive a temporary ε

from the fraction r.

This concludes the formal deﬁnition of the RGNG al-

gorithm.

2.2 RGNG-based Neuron Model

The RGNG-based neuron model uses a single RGNG

to describe a group of neurons that compete against

each other. The RGNG has a recursive depth of one

resulting in a two-layered structure (Fig. 1). The units

Modelling the Grid-like Encoding of Visual Space in Primates

Table 1: Parameters of the RGNG-based model.

= 0.04 ε

= 0.01

= 0.04 ε

= 0.0001

= 0.01 ε

= 0.01

λ = 1000 λ = 1000

τ = 300 τ = 300

α = 0.5 α = 0.5

β = 0.0005 β = 0.0005

M = 100 M =

{

20, 80

}

in the top layer (TL) correspond to the individual neu-

rons of the group. The prototypes of these TL units

are RGNGs themselves and can be interpreted as the

dendritic trees of the corresponding neurons. They

constitute the bottom layer (BL) of the model. The

prototypes of the BL units are regular vectors repre-

senting speciﬁc locations in input space.

2.2.1 Parameterization

Top and bottom layer of the model have their own

set of parameters θ

and θ

, respectively. Parameter

set θ

controls the main TL RGNG while parameter

set θ

controls all BL RGNGs, i.e., the prototypes of

the TL units. Table 1 summarizes typical parameter

values for an RGNG-based neuron model. For a de-

tailed characterization of these parameters we refer

to (Kerdels, 2016). Parameter θ

M sets the maxi-

mum number of neurons in the model and Parame-

ter θ

M controls the maximum number of speciﬁc

input space locations that a single neuron can repre-

sent within its dendritic tree. The learning rates θ

ε

and θ

ε

determine to which degree each neuron per-

forms a form of sub-threshold, competition indepen-

dent learning. In contrast, learning rate θ

ε

con-

trols how strongly the single best

neuron in the group

adapts towards a particular input. Finally, learning

rate θ

ε

can be interpreted as being inversely pro-

portional to the lateral inhibition that the most active

neuron exerts on its peers.

2.2.2 Learning

The RGNG algorithm does not have an explicit train-

ing phase. It learns continuously and updates its in-

put space approximation with every input. In case

of the RGNG-based neuron model the learning pro-

cess can be understood as a mixture of two processes.

For each input the TL RGNG has to determine which

TL unit lies closest to the input based on the distance

function D. The distance function will in turn feed

The neuron that is most active for a given input.

Figure 2: Typical visualization of a grid cell’s ﬁring pattern

as introduced by Hafting et al. (Hafting et al., 2005). Left:

trajectory (black lines) of a rat in a circular environment

with marked locations (red dots) where the observed grid

cell ﬁred. Middle: color-coded ﬁring rate map of the ob-

served grid cell ranging from dark blue (no activity) to red

(maximum activity). Right: color-coded spatial autocor-

relation of the ﬁring rate map ranging from blue (negative

correlation, -1) to red (positive correlation, +1) highlighting

the hexagonal structure of the ﬁring pattern. Figure from

Moser et al. (Moser and Moser, 2008).

the input to each BL RGNG allowing the BL RGNGs

to learn the input space structure independently from

each other. Once the closest TL unit is identiﬁed

this single unit and its direct neighbors are allowed to

preferentially adapt towards the respective input. This

second learning step aligns the individual input space

representations of the BL RGNGs in such a way that

they evenly interleave and collectively cover the input

space as well as possible (Kerdels, 2016).

2.2.3 Activity Approximation

Observations of biological neurons typically use the

momentary ﬁring rate of a neuron as indicator of the

neuron’s activity. This activity can then be correlated

with other observed variables such as the animal’s lo-

cation. The result of such a correlation can be visual-

ized as, e.g., rate map (Fig. 2), which is then used

as the basis for further analysis. Accordingly, the

RGNG-based neuron model has to estimate the ac-

tivity of each TL unit in response to a given input ξ as

well. To this end, the “activity” a

of a TL unit u is

deﬁned as:

:= e

−

(1−r)

2σ

with σ = 0.2 and ratio r:

r :=

D(s

w, ξ) − D(s

w, ξ)

D(s

w, s

w)

, s

∈ uwU,

with BL units s

and s

being the BMU and second

BMU in uwU with respect to input ξ. Based on this

measure of activity it is possible to correlate the re-

sponses of individual, simulated neurons (TL units)

to the given inputs and compare the resulting artiﬁcial

rate maps with observations reported in the literature.

NCTA 2016 - 8th International Conference on Neural Computation Theory and Applications

Figure 3: Eye and orbit anatomy with motor nerves by

Patrick J. Lynch, medical illustrator; C. Carl Jaffe, MD, car-

diologist (CC BY 2.5).

2.3 Input Space Properties

The RGNG-based neuron model can approximate ar-

bitrary input spaces as long as the set of inputs con-

stitute a sufﬁciently dense sampling of the underly-

ing space. However, not every input space will result

in a grid-like ﬁring pattern. To observe such a pat-

tern, the input space has to exhibit certain characteris-

tics. Speciﬁcally, the input samples have to originate

from a two-dimensional, uniformly distributed mani-

fold. Since the BL RGNGs will approximate such a

manifold with an induced Delaunay triangulation the

BL prototypes will be spread evenly across the mani-

fold in a periodic, triangular pattern.

This predictability of the RGNG-based model al-

lows to form testable hypothesis about potential input

signals with respect to the activity observed in biolog-

ical neurons. An example for such a hypothesis and

the resulting simulation outcomes are presented in the

next sections.

3 GAZE-POSITION INPUT

Killian et al. (Killian et al., 2012) report on neurons in

the primate medial entorhinal cortex (MEC) that show

grid-like ﬁring patterns similar to those of typical grid

cells present in the MEC of rats (Fyhn et al., 2004;

Hafting et al., 2005). Their ﬁnding is especially re-

markable since it is the ﬁrst observation of a grid-like

ﬁring pattern that is not correlated with the animal’s

location. Instead, the observed activity is correlated

with gaze-positions in the animal’s ﬁeld of view.

Given a suitable input space the RGNG-based

neuron model can replicate this ﬁring behavior. The

gaze-position in primates is essentially determined by

the four main muscles attached to the eye (Fig. 3).

Thus, a possible input signal to the RGNG-based

model could originate

from the population of mo-

tor neurons that control these muscles. In such a

signal the number of neurons that are active for a

particular muscle determines how strongly this mus-

cle contracts. A corresponding input signal ξ :=

, v

) for a given normalized gaze posi-

tion (x, y) can be implemented as four concatenated

d-dimensional vectors v

, v

and v

:= max



min



1 − δ



i+1

− x



, 1



, 0



:= max



min



1 − δ



i+1

− (1 − x)



, 1



, 0



:= max



min



1 − δ



i+1

− y



, 1



, 0



:= max



min



1 − δ



i+1

− (1 − y)



, 1



, 0



∀i ∈

{

0. . . d − 1

}

with δ = 4 deﬁning the “steepness” of the population

signal and the size d of each motor neuron population.

4 SIMULATION RESULTS

To test the input space described in the previous sec-

tion we conducted a set of simulation runs with vary-

ing sizes d of the presumed motor neuron populations.

All simulations used the ﬁxed set of parameters given

in table 1 (with θ

M = 20) and processed random

gaze-positions. The resulting artiﬁcial rate maps that

correlate each TL unit’s activity with corresponding

gaze-positions were used to calculate gridness score

distributions for each run. The gridness score was

introduced by Sargolini et al. as a measure of how

grid-like an observed ﬁring pattern is (Sargolini et al.,

2006). Gridness scores range from −2 to 2 with

scores greater than zero indicating a grid-like ﬁring

pattern, albeit more conservative thresholds between

0.3 and 0.4 are chosen in recent publications.

Figure 4 summarizes the results of the simulation

runs. The shown rate maps as well as the gridness

score distributions show that the neurons described by

the RGNG-based model form grid-like ﬁring patterns

in response to the population signal deﬁned above.

Even small population sizes yield a signiﬁcant pro-

portion of simulated neurons with gridness scores

above a 0.4 threshold.

The ﬁring patterns shown in ﬁgure 4 cover the en-

tire two-dimensional manifold of the population sig-

nal, i.e., the entire ﬁeld of view. At its borders a strong

As a so-called efference copy

Modelling the Grid-like Encoding of Visual Space in Primates

Figure 4: Artiﬁcial rate maps and gridness distributions of

simulation runs that processed input from a varying num-

ber d of presumed motor neurons per muscle (columns) that

control the gaze-position. All simulation runs used a ﬁxed

set of parameters as given in table 1 (θ

M = 20) and pro-

cessed random gaze locations. Each artiﬁcial rate map was

chosen randomly from the particular set of rate maps and

displays all of the respective TL unit’s ﬁring ﬁelds. The

gridness distributions show the gridness values of all TL

units. Gridness threshold of 0.4 indicated by red marks.

alignment of the ﬁring ﬁelds can be observed which

may inﬂuence the resulting gridness scores. Since it

is unlikely that experimental observations of natural

neurons will cover the entire extent of an underlying

input space, we investigated how the partial obser-

vation of ﬁring ﬁelds may inﬂuence gridness score

distributions. Figure 5 shows the results of a sec-

ond series of simulation runs. Again, all simulation

runs used the set of parameters given in table 1 but

with θ

M = 80 prototypes per neuron instead of 20.

In addition to artiﬁcial rate maps that contain all ﬁr-

ing ﬁelds of the respective neurons, we also gener-

ated rate maps containing only one-quarter or one-

sixteenth of the particular ﬁring ﬁelds. The result-

ing gridness score distributions show that rate maps

based on local subsets of ﬁring ﬁelds tend to have

higher gridness scores than the rate maps containing

all ﬁring ﬁelds. This indicates that local distortions

of the overall grid pattern remain local with respect

to their inﬂuence on the gridness of other regions. As

a consequence, grid-like ﬁring patterns may be ob-

served in natural neurons that receive signals from in-

put spaces that are only partially two-dimensional and

evenly distributed. As long as the experimental con-

ditions restrict the input signals to these regions the

resulting ﬁring rate maps will exhibit grid-like pat-

terns. If the input signals shift to other regions of in-

put space, the grid-like ﬁring patterns may then get

distorted or fully disappear.

Figure 5: Artiﬁcial rate maps and gridness distributions of

simulation runs presented like in ﬁgure 4, but with parame-

ter θ

M = 80 and containing either all, one-quarter, or one-

sixteenth (rows) of the respective TL unit’s ﬁring ﬁelds.

5 CONCLUSIONS

The contemporary view on grid cells interprets their

behavior as a specialized part within a system for ori-

entation and navigation that contributes to the inte-

gration of speed and direction. However, recent ex-

perimental ﬁndings indicate that grid-like ﬁring pat-

terns are more prevalent and functionally more di-

verse than previously assumed. Based on these ob-

servations we hypothesized that a more general infor-

mation processing scheme may underlie the ﬁring be-

havior of grid cells. We developed a RGNG-based

neuron model to test this hypothesis. In this paper

we demonstrate that the RGNG-based model can –

in contrast to established grid cell models – describe

the grid-like activity of neurons other than typical grid

NCTA 2016 - 8th International Conference on Neural Computation Theory and Applications

cells, i.e., neurons that encode gaze-positions in the

animal’s ﬁeld of view rather than the animal’s loca-

tion in its environment.

In addition, we outlined the general conditions un-

der which we would expect grid-like ﬁring patterns

to occur in neurons that utilize the general informa-

tion processing scheme expressed by the RGNG al-

gorithm. As these conditions depend solely on char-

acteristics of the input signal, i.e., on the data that

are processed by the respective neurons, the RGNG-

based model allows to form testable predictions on the

input-output relations of biological, neuronal circuits.

Shifting interpretations of neurobiological circuits

from models based on application-speciﬁc priors to

models based primarily on general, computational

principles may prove to be beneﬁcial for the wider

understanding of high-level cortical circuits. They

may allow to relate experimental observations made

in very different contexts on an abstract, computa-

tional level and thus promote a deeper understanding

of common neuronal principles and structures.

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Modelling the Grid-like Encoding of Visual Space in Primates