E. Gardner scite author profile

The typical fraction of the space of interactions between each pair of N Ising spins which solve the problem of storing a given set of p random patterns as N-bit spin configurations is considered. The volume is calculated explicitly as a function of the storage ratio, a = p / N , of the value K (> O) of the product of the spin and the magnetic field at each site and of the magnetisation, m. Here m may vary between 0 (no correlation) and 1 (completely correlated). The capacity increases with the correlation between patterns from a = 2 for correlated patterns with K = 0 and tends to infinity as m tends to 1. The calculations use a saddle-point method and the order parameters at the saddle point are assumed to be replica symmetric. This solution is shown to be locally stable. A local iterative learning algorithm for updating the interactions is given which will converge to a solution of given K provided such solutions exist.

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Spin glasses with p-spin interactions

Gardner¹

1985

Nuclear Physics B

404

417

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Optimal storage properties of neural network models

Gardner

Derrida

1988

J. Phys. A: Math. Gen.

513

412

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We calculate the number, p = a N of random N-bit patterns that an optimal neural network can store allowing a given fraction f of bit errors and with the condition that each right bit is stabilised by a local field at least equal to a parameter K. For each value of a and K, there is a minimum fraction f,,, of wrong bits. We find a critical line, a , (K) with a,(O) = 2. The minimum fraction of wrong bits vanishes for a EC cyc(K) a n d increases from zero for a > a,(K 1. The calculations are done using a saddle-point method and the order parameters at the saddle point are assumed to be replica symmetric. This solution is locally stable in a finite region of the K,a plane including the line, a , (K) but there is a line above which the solution becomes unstable and replica symmetry must be broken.

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An Exactly Solvable Asymmetric Neural Network Model

Derrida

Gardner

Zippelius³

1987

Europhys. Lett.

540

332

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We consider a diluted and nonsymmetric version of the Little-Hopfield model which can be solved exactly. We obtain the analytic expression of the evolution of one configuration having a finite overlap on one stored pattern. We show that even when the system remembers, two different configurations which remain close to the same pattern never become identical. Lastly, we show that when two stored patterns are correlated, there exists a regime for which the system remembers these patterns without being able to distinguish them.

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Lyapounov exponent of the one dimensional Anderson model : weak disorder expansions

1984

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E. Gardner

The space of interactions in neural network models

Spin glasses with p-spin interactions

Optimal storage properties of neural network models

An Exactly Solvable Asymmetric Neural Network Model

Lyapounov exponent of the one dimensional Anderson model : weak disorder expansions

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