src/math/ChebyshevPolynomials.hpp

/*
 * Copyright (c) 2005 The University of Notre Dame. All Rights Reserved.
 *
 * The University of Notre Dame grants you ("Licensee") a
 * non-exclusive, royalty free, license to use, modify and
 * redistribute this software in source and binary code form, provided
 * that the following conditions are met:
 *
 * 1. Acknowledgement of the program authors must be made in any
 *    publication of scientific results based in part on use of the
 *    program.  An acceptable form of acknowledgement is citation of
 *    the article in which the program was described (Matthew
 *    A. Meineke, Charles F. Vardeman II, Teng Lin, Christopher
 *    J. Fennell and J. Daniel Gezelter, "OOPSE: An Object-Oriented
 *    Parallel Simulation Engine for Molecular Dynamics,"
 *    J. Comput. Chem. 26, pp. 252-271 (2005))
 *
 * 2. Redistributions of source code must retain the above copyright
 *    notice, this list of conditions and the following disclaimer.
 *
 * 3. Redistributions in binary form must reproduce the above copyright
 *    notice, this list of conditions and the following disclaimer in the
 *    documentation and/or other materials provided with the
 *    distribution.
 *
 * This software is provided "AS IS," without a warranty of any
 * kind. All express or implied conditions, representations and
 * warranties, including any implied warranty of merchantability,
 * fitness for a particular purpose or non-infringement, are hereby
 * excluded.  The University of Notre Dame and its licensors shall not
 * be liable for any damages suffered by licensee as a result of
 * using, modifying or distributing the software or its
 * derivatives. In no event will the University of Notre Dame or its
 * licensors be liable for any lost revenue, profit or data, or for
 * direct, indirect, special, consequential, incidental or punitive
 * damages, however caused and regardless of the theory of liability,
 * arising out of the use of or inability to use software, even if the
 * University of Notre Dame has been advised of the possibility of
 * such damages.
 */
 
/**
 * @file ChebyshevPolynomials.hpp
 * @author    teng lin
 * @date  11/16/2004
 * @version 1.0
 */ 

#ifndef MATH_CHEBYSHEVPOLYNOMIALS_HPP
#define MATH_CHEBYSHEVPOLYNOMIALS_HPP

#include <vector>

#include "math/Polynomial.hpp"

namespace oopse {

  /**
   * @class ChebyshevPolynomials
   * A collection of Chebyshev Polynomials.
   * @todo document
   */
  class ChebyshevPolynomials {
  public:
    ChebyshevPolynomials(int maxPower);

    /**
     * Calculates the value of the nth Chebyshev Polynomial evaluated at the given x value.
     * @return The value of the nth Chebyshev Polynomial evaluates at the given x value
     * @param n
     * @param x the value of the independent variable for the nth Chebyshev Polynomial  function
     */
        
    double evaluate(int n, double x) {
      assert (n <= maxPower_ && n >=0); 
      return polyList_[n].evaluate(x);
    }

    /**
     * Returns the first derivative of the nth Chebyshev Polynomial.
     * @return the first derivative of the nth Chebyshev Polynomial
     * @param n
     * @param x the value of the independent variable for the nth Chebyshev Polynomial  function
     */
    double evaluateDerivative(int n, double x) {
      assert (n <= maxPower_ && n >=0); 
      return polyList_[n].evaluateDerivative(x);        
    }

    /**
     * Returns the nth Chebyshev Polynomial 
     * @return the nth Chebyshev Polynomial
     * @param n
     */
    const DoublePolynomial& getChebyshevPolynomial(int n) const {
      assert (n <= maxPower_ && n >=0); 
      return polyList_[n];
    }

  protected:

    std::vector<DoublePolynomial> polyList_;
                
  private:
        
    void GeneratePolynomials(int maxPower);
    virtual void GenerateFirstTwoTerms() = 0;
        
    int maxPower_;
  };    

  /**
   * @class ChebyshevT
   * @todo document
   */
  class ChebyshevT : public ChebyshevPolynomials {
  public:
    ChebyshevT(int maxPower) :ChebyshevPolynomials(maxPower) {}

  private:
    virtual void GenerateFirstTwoTerms();
  };

  /**
   * @class ChebyshevU
   * @todo document
   */
  class ChebyshevU : public ChebyshevPolynomials {
  public:
    ChebyshevU(int maxPower) :ChebyshevPolynomials(maxPower) {}

  private:
    virtual void GenerateFirstTwoTerms();
  };


} //end namespace oopse
#endif //MATH_CHEBYSHEVPOLYNOMIALS_HPP
Revision:	2204
Committed:	Fri Apr 15 22:04:00 2005 UTC (19 years, 2 months ago) by gezelter
File size:	4412 byte(s)
Log Message:	xemacs has been drafted to perform our indentation services
#	User	Rev	Content
1	gezelter	2204	/*
2	gezelter	1930	* Copyright (c) 2005 The University of Notre Dame. All Rights Reserved.
3			*
4			* The University of Notre Dame grants you ("Licensee") a
5			* non-exclusive, royalty free, license to use, modify and
6			* redistribute this software in source and binary code form, provided
7			* that the following conditions are met:
8			*
9			* 1. Acknowledgement of the program authors must be made in any
10			* publication of scientific results based in part on use of the
11			* program. An acceptable form of acknowledgement is citation of
12			* the article in which the program was described (Matthew
13			* A. Meineke, Charles F. Vardeman II, Teng Lin, Christopher
14			* J. Fennell and J. Daniel Gezelter, "OOPSE: An Object-Oriented
15			* Parallel Simulation Engine for Molecular Dynamics,"
16			* J. Comput. Chem. 26, pp. 252-271 (2005))
17			*
18			* 2. Redistributions of source code must retain the above copyright
19			* notice, this list of conditions and the following disclaimer.
20			*
21			* 3. Redistributions in binary form must reproduce the above copyright
22			* notice, this list of conditions and the following disclaimer in the
23			* documentation and/or other materials provided with the
24			* distribution.
25			*
26			* This software is provided "AS IS," without a warranty of any
27			* kind. All express or implied conditions, representations and
28			* warranties, including any implied warranty of merchantability,
29			* fitness for a particular purpose or non-infringement, are hereby
30			* excluded. The University of Notre Dame and its licensors shall not
31			* be liable for any damages suffered by licensee as a result of
32			* using, modifying or distributing the software or its
33			* derivatives. In no event will the University of Notre Dame or its
34			* licensors be liable for any lost revenue, profit or data, or for
35			* direct, indirect, special, consequential, incidental or punitive
36			* damages, however caused and regardless of the theory of liability,
37			* arising out of the use of or inability to use software, even if the
38			* University of Notre Dame has been advised of the possibility of
39			* such damages.
40			*/
41
42			/**
43			* @file ChebyshevPolynomials.hpp
44			* @author teng lin
45			* @date 11/16/2004
46			* @version 1.0
47			*/
48
49			#ifndef MATH_CHEBYSHEVPOLYNOMIALS_HPP
50			#define MATH_CHEBYSHEVPOLYNOMIALS_HPP
51
52			#include <vector>
53
54			#include "math/Polynomial.hpp"
55
56			namespace oopse {
57
58	gezelter	2204	/**
59			* @class ChebyshevPolynomials
60			* A collection of Chebyshev Polynomials.
61			* @todo document
62			*/
63			class ChebyshevPolynomials {
64			public:
65			ChebyshevPolynomials(int maxPower);
66	gezelter	1930
67	gezelter	2204	/**
68			* Calculates the value of the nth Chebyshev Polynomial evaluated at the given x value.
69			* @return The value of the nth Chebyshev Polynomial evaluates at the given x value
70			* @param n
71			* @param x the value of the independent variable for the nth Chebyshev Polynomial function
72			*/
73	gezelter	1930
74	gezelter	2204	double evaluate(int n, double x) {
75			assert (n <= maxPower_ && n >=0);
76			return polyList_[n].evaluate(x);
77			}
78	gezelter	1930
79	gezelter	2204	/**
80			* Returns the first derivative of the nth Chebyshev Polynomial.
81			* @return the first derivative of the nth Chebyshev Polynomial
82			* @param n
83			* @param x the value of the independent variable for the nth Chebyshev Polynomial function
84			*/
85			double evaluateDerivative(int n, double x) {
86			assert (n <= maxPower_ && n >=0);
87			return polyList_[n].evaluateDerivative(x);
88			}
89	gezelter	1930
90	gezelter	2204	/**
91			* Returns the nth Chebyshev Polynomial
92			* @return the nth Chebyshev Polynomial
93			* @param n
94			*/
95			const DoublePolynomial& getChebyshevPolynomial(int n) const {
96			assert (n <= maxPower_ && n >=0);
97			return polyList_[n];
98			}
99	gezelter	1930
100	gezelter	2204	protected:
101	gezelter	1930
102	gezelter	2204	std::vector<DoublePolynomial> polyList_;
103	gezelter	1930
104	gezelter	2204	private:
105	gezelter	1930
106	gezelter	2204	void GeneratePolynomials(int maxPower);
107			virtual void GenerateFirstTwoTerms() = 0;
108	gezelter	1930
109	gezelter	2204	int maxPower_;
110			};
111	gezelter	1930
112	gezelter	2204	/**
113			* @class ChebyshevT
114			* @todo document
115			*/
116			class ChebyshevT : public ChebyshevPolynomials {
117			public:
118			ChebyshevT(int maxPower) :ChebyshevPolynomials(maxPower) {}
119	gezelter	1930
120	gezelter	2204	private:
121			virtual void GenerateFirstTwoTerms();
122			};
123	gezelter	1930
124	gezelter	2204	/**
125			* @class ChebyshevU
126			* @todo document
127			*/
128			class ChebyshevU : public ChebyshevPolynomials {
129			public:
130			ChebyshevU(int maxPower) :ChebyshevPolynomials(maxPower) {}
131	gezelter	1930
132	gezelter	2204	private:
133			virtual void GenerateFirstTwoTerms();
134			};
135	gezelter	1930
136
137			} //end namespace oopse
138			#endif //MATH_CHEBYSHEVPOLYNOMIALS_HPP