We study the extent to which it is possible to approximate the optimal value of a Unique Games instance in Fixed-Point Logic with Counting (FPC). We prove two new FPC-inexpressibility results for Unique Games: the existence of a (1/2, 1/3 + $\delta$)-inapproximability gap, and inapproximability to within any constant factor. Previous recent work has established similar FPC-inapproximability results for a small handful of other problems. Our construction builds upon some of these ideas, but contains a novel technique. While most FPC-inexpressibility results are based on variants of the CFI-construction, ours is significantly different
The key tool in proving inexpressibility results in finite-model theory is EhrenfeuchtFra iss'e...
In this paper we show a reduction from the Unique Games problem to the problem of approximating MAX-...
We study the problem of approximating the value of a Unique Game instance in the streaming model. A ...
We consider the hardness of approximation of optimization problems from the point of view of definab...
We consider the hardness of approximation of optimization problems from the point of view of definab...
We consider the hardness of approximation of optimization problems from the point of view of definab...
We present a polynomial time algorithm based on semidefinite programming that, given a unique game o...
We show how two techniques from statistical physics can be adapted to solve a variant of the notorio...
In this report, we study the Unique Games conjecture of Khot [32] and its implications on the hardne...
In this report, we study the Unique Games conjecture of Khot [32] and its implications on the hardne...
We reduce the problem of proving a "Boolean Unique Games Conjecture" (with gap 1-? vs. 1-C?, for any...
We establish the expressibility in fixed-point logic with counting (FPC) of a number of natural poly...
Abstract. For two-player games of perfect information such as Checkers, Chess, and Go we introduce “...
We consider one-round games between a classical verifier and two provers who share entanglement. We ...
We consider one-round games between a classical verifier and two provers who share entanglement. We ...
The key tool in proving inexpressibility results in finite-model theory is EhrenfeuchtFra iss'e...
In this paper we show a reduction from the Unique Games problem to the problem of approximating MAX-...
We study the problem of approximating the value of a Unique Game instance in the streaming model. A ...
We consider the hardness of approximation of optimization problems from the point of view of definab...
We consider the hardness of approximation of optimization problems from the point of view of definab...
We consider the hardness of approximation of optimization problems from the point of view of definab...
We present a polynomial time algorithm based on semidefinite programming that, given a unique game o...
We show how two techniques from statistical physics can be adapted to solve a variant of the notorio...
In this report, we study the Unique Games conjecture of Khot [32] and its implications on the hardne...
In this report, we study the Unique Games conjecture of Khot [32] and its implications on the hardne...
We reduce the problem of proving a "Boolean Unique Games Conjecture" (with gap 1-? vs. 1-C?, for any...
We establish the expressibility in fixed-point logic with counting (FPC) of a number of natural poly...
Abstract. For two-player games of perfect information such as Checkers, Chess, and Go we introduce “...
We consider one-round games between a classical verifier and two provers who share entanglement. We ...
We consider one-round games between a classical verifier and two provers who share entanglement. We ...
The key tool in proving inexpressibility results in finite-model theory is EhrenfeuchtFra iss'e...
In this paper we show a reduction from the Unique Games problem to the problem of approximating MAX-...
We study the problem of approximating the value of a Unique Game instance in the streaming model. A ...