AbstractWe obtain some dramatic results using statistical mechanics-thermodynamics kinds of arguments concerning randomness, chaos, unpredictability, and uncertainty in mathematics. We construct an equation involving only whole numbers and addition, multiplication, and exponentiation, with the property that if one varies a parameter and asks whether the number of solutions is finite or infinite, the answer to this question is indistinguishable from the result of independent tosses of a fair coin. This yields a number of powerful Gödel incompleteness-type results concerning the limitations of the axiomatic method, in which entropy-information measures are used
It is usual to identify initial conditions of classical dynamical systems with mathematical real num...
For a brief time in history, it was possible to imagine that a sufficiently advanced intellect could...
In this paper we prove Chaitin’s “heuristic principle”, the theorems of a finitelyspecified theory c...
We obtain some dramatic results using statistical mechanics--thermodynamics kinds of arguments conce...
This thesis examines some problems related to Chaitin’s Ω number. In the first section, we describe ...
AbstractComputably enumerable (c.e.) reals can be coded by Chaitin machines through their halting pr...
Goedel's Incompleteness Theorems have the same scientific status as Einstein's principle of relativi...
AbstractA real α is computably enumerable if it is the limit of a computable, increasing, converging...
We discuss mathematical and physical arguments contrasting continuous and discrete, limitless discre...
A real is computable if it is the limit of a computable, increasing, computably converging sequence ...
AbstractWe consider various mathematical refinements of the notion of randomness of an infinite sequ...
In this dissertation we investigate two questions in the subject of algorithmic randomness. The firs...
In 1927 Heisenberg discovered that the "more precisely the position is determined, the less precisel...
AbstractIn this paper we prove Chaitin's “heuristic principle,” the theorems of a finitely-specified...
AbstractSchnorr randomness is a notion of algorithmic randomness for real numbers closely related to...
It is usual to identify initial conditions of classical dynamical systems with mathematical real num...
For a brief time in history, it was possible to imagine that a sufficiently advanced intellect could...
In this paper we prove Chaitin’s “heuristic principle”, the theorems of a finitelyspecified theory c...
We obtain some dramatic results using statistical mechanics--thermodynamics kinds of arguments conce...
This thesis examines some problems related to Chaitin’s Ω number. In the first section, we describe ...
AbstractComputably enumerable (c.e.) reals can be coded by Chaitin machines through their halting pr...
Goedel's Incompleteness Theorems have the same scientific status as Einstein's principle of relativi...
AbstractA real α is computably enumerable if it is the limit of a computable, increasing, converging...
We discuss mathematical and physical arguments contrasting continuous and discrete, limitless discre...
A real is computable if it is the limit of a computable, increasing, computably converging sequence ...
AbstractWe consider various mathematical refinements of the notion of randomness of an infinite sequ...
In this dissertation we investigate two questions in the subject of algorithmic randomness. The firs...
In 1927 Heisenberg discovered that the "more precisely the position is determined, the less precisel...
AbstractIn this paper we prove Chaitin's “heuristic principle,” the theorems of a finitely-specified...
AbstractSchnorr randomness is a notion of algorithmic randomness for real numbers closely related to...
It is usual to identify initial conditions of classical dynamical systems with mathematical real num...
For a brief time in history, it was possible to imagine that a sufficiently advanced intellect could...
In this paper we prove Chaitin’s “heuristic principle”, the theorems of a finitelyspecified theory c...