Now showing items 5-24 of 141

  • Algorithmic specified complexity. 

    Ewert, Winston. (, 2013-09-24)
    Information theory is a well developed field, but does not capture the essence of what information is. Shannon Information captures something in its definition of improbability as information. But not all improbable ...
  • Analysis of transaction throughput in P2P environments. 

    Chokkalingam, Arun. (2006-05-28)
    In recent years P2P systems have gained tremendous popularity. Support of a transaction processing facility in P2P systems would provide databases at a low cost. Extending distributed database algorithms such as 2PC and ...
  • Anti-Symmetry and Logic Simulation 

    Maurer, Peter M. (2012-01-19)
    Like ordinary symmetries, anti-symmetries are defined in terms of relations between function cofactors. For ordinary symmetries, two cofactors must be equal, for anti-symmetries two cofactors must be complements of ...
  • AN APPLICATION OF GROUP THEORY TO THE ANALYSIS OF SYMMETRIC GATES 

    Maurer, Peter M. (2009-10-26)
    A method for determining the symmetries of the inputs of a logic gate either from its truth table or from facts obtained by inspection of its circuit is presented. The symmetry rule of a gate with n inputs is defined in ...
  • Bootstrapping Bipartite Graphs Consisting of Edges Based on Ontology Terms Occurring in Scientific Abstract 

    Morillo, Daniel (2011-05-13)
    The Ontological Discovery Environment (ODE) provides an efficient structure for storage of gene and pheno- type relations. The relations can be represented by a bipartite graph, where the gene and phenotype items can be ...
  • Calibration methodology for a microwave non-invasive glucose sensor. 

    McClung, Melanie J. (2008-06-09)
    Non-invasive measuring techniques for determining biological parameters are more heavily researched with the growth of the biomedical industry. One of the top areas in non-invasive research deals with diabetes. This ...
  • Categories for Component Level Design 

    Maurer, Peter M. (2009-02-18)
    Several research problems are discussed, including communication mechanisms and the interface between components and the glue logic used to tie them together. A technique for engineering new component-level applications ...
  • The Class 1 4x4 Faithful Representations of S4 over GF(2) 

    Maurer, Peter M. (2013-09-20)
    There are 9 conjugacy classes of faithful representations of S4 in the general linear group of 4x4 matrices over GF(2). This report lists the representations belonging to class 1.
  • The Class 10 4x4 Faithful Representations of S4 over GF(2) 

    Maurer, Peter M. (2013-09-20)
    There are 9 conjugacy classes of faithful representations of S4 in the general linear group of 4x4 matrices over GF(2). This report lists the representations belonging to class 10. (There is no class 6, so the classes are ...
  • The Class 2 4x4 Faithful Representations of S4 over GF(2) 

    Maurer, Peter M. (2013-09-20)
    There are 9 conjugacy classes of faithful representations of S4 in the general linear group of 4x4 matrices over GF(2). This report lists the representations belonging to class 2.
  • The Class 3 4x4 Faithful Representations of S4 over GF(2) 

    Maurer, Peter M. (2013-09-20)
    There are 9 conjugacy classes of faithful representations of S4 in the general linear group of 4x4 matrices over GF(2). This report lists the representations belonging to class 3.
  • The Class 4 4x4 Faithful Representations of S4 over GF(2) 

    Maurer, Peter M. (2013-09-20)
    There are 9 conjugacy classes of faithful representations of S4 in the general linear group of 4x4 matrices over GF(2). This report lists the representations belonging to class 4.
  • The Class 5 4x4 Faithful Representations of S4 over GF(2) 

    Maurer, Peter M. (2013-09-20)
    There are 9 conjugacy classes of faithful representations of S4 in the general linear group of 4x4 matrices over GF(2). This report lists the representations belonging to class 5.
  • The Class 7 4x4 Faithful Representations of S4 over GF(2) 

    Maurer, Peter M. (2013-09-20)
    There are 9 conjugacy classes of faithful representations of S4 in the general linear group of 4x4 matrices over GF(2). This report lists the representations belonging to class 7.
  • The Class 8 4x4 Faithful Representations of S4 over GF(2) 

    Maurer, Peter M. (2013-09-20)
    There are 9 conjugacy classes of faithful representations of S4 in the general linear group of 4x4 matrices over GF(2). This report lists the representations belonging to class 8. This class includes the standard representation ...
  • Class 9 4x4 Faithful Representations of S4 over GF(2) 

    Maurer, Peter M. (2013-09-20)
    There are 9 conjugacy classes of faithful representations of S4 in the general linear group of 4x4 matrices over GF(2). This report lists the representations belonging to class 9.
  • A comparison of field programmable gate arrays and digital signal processors in acoustic array processing. 

    Stevenson, Jeremy C. (2006-07-29)
    The Field Programmable Gate Array's (FPGA) constant growth in computing power has given embedded system developers a choice to replace their current processors with a FPGA. However, most systems continue to use the original ...
  • The Complexity of Detecting Symmetric Functions 

    Maurer, Peter M. (2009-02-18)
    The characterization of the symmetries of boolean functions is important both in automatic layout synthesis, and in automatic verification of manually created layouts. It is possible to characterize the symmetries of an ...
  • The Conjugacy Classes of 3x3 and 4x4 Matrices Over GF(2) 

    Maurer, Peter M. (2013-09-20)
    The general linear groups over GF(2) have an intricate and interesting structure. This report does some preliminary work in examining the structure of two of these groups by giving the conjugacy classes of 3x3 and 4x4 ...
  • Conjugates of the Standard Representation of S3 in 3x3 matrices 

    Maurer, Peter M. (2013-09-20)
    This is a list of the 28 conjugates of the standard representation of S3 in 3x3 matrices.