TIME DEPENDENT CONSTRAINTS IN CLASSICAL DYNAMICSMUKUNDA N.1980; PHYS. SCR.; ISSN 0031-8949; SWE; DA. 1980; VOL. 21; NO 6; PP. 801-804; BIBL. 8 REF.Article

ALGEBRAIC ASPECTS OF THE WIGNER DISTRIBUTION IN QUANTUM MECHANICSMUKUNDA N.1978; PRAMANA; IND; DA. 1978; VOL. 11; NO 1; PP. 1-15; BIBL. 13 REF.Article

CLASSICAL LIMIT OF UNITARY TRANSFORMATIONS IN QUANTUM THEORY.MUKUNDA N.1976; J. MATH. PHYS. SCI.; INDIA; DA. 1976; VOL. 10; NO 1; PP. 69-76; BIBL. 7 REF.Article

PHASE SPACE METHODS AND THE HAMILTON-JACOBI FORM OF DYNAMICS.MUKUNDA N.1978; PROC. INDIAN ACAD. SCI., A; IND; DA. 1978; VOL. 87; NO 5; PP. 85-105; BIBL. 19 REF.Article

GENERATORS OF SYMMETRY TRANSFORMATIONS FOR CONSTRAINED HAMILTONIAN SYSTEMSMUKUNDA N.1980; PHYS. SCR.; ISSN 0031-8949; SWE; DA. 1980; VOL. 21; NO 6; PP. 783-791; BIBL. 6 REF.Article

Bose statistics : before and afterMUKUNDA, N.Current science (Bangalore). 1994, Vol 66, Num 12, pp 954-964, issn 0011-3891Article

STRUCTURE AND REPRESENTATION OF CORRELATION FUNCTIONS AND THE DENSITY MATRIX FOR A STATISTICAL WAVE FIELD IN OPTICSSUDARSHAN ECG; MUKUNDA N.1979; J. MATH. PHYS.; USA; DA. 1979; VOL. 20; NO 8; PP. 1801-1810; BIBL. 20 REF.Article

Mechanical models for Lorentz group representationsMUKUNDA, N.Foundations of physics. 1993, Vol 23, Num 2, pp 245-260, issn 0015-9018Article

THE CLEBSCH-GORDAN PROBLEM AND COEFFICIENTS FOR THE THREE-DIMENSIONAL LORENTZ GROUP IN A CONTINUOUS BASIS. III.MUKUNDA N; RADHAKRISHNAN B.1974; J. MATH. PHYS.; U.S.A.; DA. 1974; VOL. 15; NO 10; PP. 1643-1655; BIBL. 15 REF.Article

THE CLEBSCH-GORDAN PROBLEM AND COEFFICIENTS FOR THE THREE-DIMENSIONAL LORENTZ GROUP IN A CONTINUOUS BASIS. IV.MUKUNDA N; RADHAKRISHNAN B.1974; J. MATH. PHYS.; U.S.A.; DA. 1974; VOL. 15; NO 10; PP. 1656-1668; BIBL. 7 REF.Article

RELATION BETWEEN NAMBU AND HAMILTONIAN MECHANICS.MUKUNDA N; SUDARSHAN ECG.1976; PHYS. REV., D; U.S.A.; DA. 1976; VOL. 13; NO 10; PP. 2846-2850; BIBL. 7 REF.Article

NEW FORMS FOR THE REPRESENTATIONS OF THE THREE-DIMENSIONAL LORENTZ GROUPMUKUNDA N; RADHAKRISHNAN B.1973; J. MATH. PHYS.; U.S.A.; DA. 1973; VOL. 14; NO 2; PP. 254-258; BIBL. 13 REF.Serial Issue

Dirac, Harish-Chandra and the unitary representations of the Lorentz group : Special section : Harish-ChandraMUKUNDA, N.Current science (Bangalore). 1993, Vol 65, Num 12, pp 936-940, issn 0011-3891Article

THE HAMILTON-JACOBI EQUATION REVISITED.BABU JOSEPH K; MUKUNDA N.1975; PRAMANA; INDIA; DA. 1975; VOL. 4; NO 1; PP. 1-18; BIBL. 10 REF.Article

RELATIVISTICALLY INTERACTING PARTICLES AND WORLD LINESGOLDBERG JN; SUDARSHAN ECG; MUKUNDA N et al.1981; PHYS. REV. D; ISSN 0556-2821; USA; DA. 1981; VOL. 23; NO 10; PP. 2231-2235; BIBL. 15 REF.Article

COHERENT-STATE REPRESENTATION OF A NON-ABELIAN CHARGED QUANTUM FIELDERIKSSON KE; MUKUNDA N; SKAGERSTAM BS et al.1981; PHYS. REV. D; ISSN 0556-2821; USA; DA. 1981; VOL. 24; NO 10; PP. 2615-2625; BIBL. 23 REF.Article

RELATIVISTIC POTENTIAL MODELS AS SYSTEMS WITH CONSTRAINTS AND THEIR INTERPRETATIONKIHLBERG A; MARNELIUS R; MUKUNDA N et al.1981; PHYS. REV. D; ISSN 0556-2821; USA; DA. 1981; VOL. 23; NO 10; PP. 2201-2209; BIBL. 20 REF.Article

COMPOSITE SYSTEMS VIEWED AS RELATIVISTIC QUANTAL ROTATORS: VECTORIAL AND SPINORIAL MODELSMUKUNDA N; VANDAM H; BIEDENHARN LC et al.1980; PHYS. REV. D; ISSN 0556-2821; USA; DA. 1980; VOL. 22; NO 8; PP. 1938-1951; BIBL. 17 REF.Article

Twisted Gaussian schell-model beamsSIMON, R; MUKUNDA, N.Journal of the Optical Society of America. A, Optics and image science. 1993, Vol 10, Num 1, pp 95-109, issn 0740-3232Article

Quantum kinematic approach to the geometric phase. I: General formalismMUKUNDA, N; SIMON, R.Annals of physics (Print). 1993, Vol 228, Num 2, pp 205-268, issn 0003-4916Article

Classical particles with internal structure. II: Second-order internal spacesATRE, M. V; MUKUNDA, N.Journal of mathematical physics. 1987, Vol 28, Num 4, pp 792-806, issn 0022-2488Article

EVOLUTION, SYMMETRY, AND CANONICAL STRUCTURE IN DYNAMICSMUKUNDA N; BALACHANDRAN AP; NILSSON JS et al.1981; PHYS. REV. D; ISSN 0556-2821; USA; DA. 1981; VOL. 23; NO 10; PP. 2189-2200; BIBL. 7 REF.Article

REPRESENTATIONS AND PROPERTIES OF PARA-BOSE OSCILLATOR OPERATORS. I: ENERGY POSITION AND MOMENTUM EIGENSTATESMUKUNDA N; SUDARSHAN ECG; SHARMA JK et al.1980; J. MATH. PHYS. (N. Y.); ISSN 0022-2488; USA; DA. 1980; VOL. 21; NO 9; PP. 2386-2394; BIBL. 19 REF.Article

Bargmann invariant and the geometry of the Güoy effectSIMON, R; MUKUNDA, N.Physical review letters. 1993, Vol 70, Num 7, pp 880-883, issn 0031-9007Article

Classical particles with internal structure: general formalism and application to first-order internal spacesATRE, M. V; MUKUNDA, N.Journal of mathematical physics. 1986, Vol 27, Num 12, pp 2908-2919, issn 0022-2488Article