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Full Screen- TITLE
- DEDICATION
- DECLARATION
- CERTIFICATE
- ACKNOWLEDGEMENT
- CONTENTS
- PREFACE
- I. ELASTIC COEFFICIENTS AND THERMAL EXPANSION SUPERCONDUCTING SINGLE CRYSTALS
- 1.1. Introduction.
- 1.2. Theory of elasticity.
- 1.3. Experimental methods in the study of elastic wave propagation in crystals.
- 1.4. Velocity measurements leading to determination of elastic constants.
- Fig. 1.2. BLOCK DIAGRAM OF PULSE ECRO SET UP ANDTHE FORM OF THE PATTERN ON CRO SCREEN.
- 1.5. Quasiharmonic theory of thermal expansion of orthorhombic crystals.
- 1.6. High temperature super conducting systems.
- Fig. 1.3. PEROVSKITE STRUCTURE AB03
- Fig. 1.4. ARRANGEMENT OF THE DIFFERENT ATOMSIN TEE UNIT CELL OF THE HIGH TEMPERATURESUPERCONDUCTING CRYSTAL YB~CYO,.
- References.
- II. INTERLATTICE DISPLACEMENTS OF THE HIGH TC SUPERCONDUCTORS
- 2.1. Introduction.
- Fig. 2.1. ARRANGEMENT OF THE DIFFERENT RARE EARTH IBARIUM, COPPER AND OXYGEN ATOMS I N THE UNIT CELL OFTHE HIGH TEMPERATURE SUPERCONDUCTING CRYSTALRB%C%07.
- 2.2. Interlattice displacements.
- 2.3. Interlattice displacements of RBa2Cu3O7
- Table 2.1: Unit cell dimensions of RBa2Cu3O7 where R = Y, Sm, Gd, Dy, Ho, Er, Tm and a, h, c are0 lattice parameters in A 0
- Table 2.2 Position co-ordinates o: the neighbour of13 atoms in the unit cell
- References.
- III. SECOND ORDER ELASTIC CONSTANTS OF YBa2Cu3O7 AND GdBa2Cu307
- 3.1. Introduction.
- 3.2. Theory of second order elastic constants.
- 3.3. Second order elastic constants of YBa2Cu3O7.
- 3.4. Second order elastic constants of GdBa2Cu307.
- 3.5. Results and discussion.
- Table (3.1) Second order elastic constants of the hightemperature superconducting compound YBa Cu 02 3 7
- Table (3.2) Second order elastic constants of GdBa Cu 02 3 7
- References.
- IV. THIRD ORDER ELASTIC CONSTANTS OF YBa2Cu3O7 AN GdBa2Cu3O7
- 4.1. Introduction.
- 4.2. General theory of third order elastic constants.
- 4.3. Third order elastic constants of YBa2Cu3O7.
- 4.4. Third order elastic constants of GdBa2Cu3O7.
- 4.5. Results and discussion.
- Table 4. 1: Third order elastic constants of the hightemperature superconducting compound YBa Cu 0 2 3 7
- Tahle 4.2: Third order elastic constants of the hightemperature superconducting compound GdBa 2 Cu3 07
- References.
- V. PRESSURE DERIVATIVES OF THE SECOND ORDER ELASTIC CONSTANTS OF HIGH TEMPERATURE SUPERCONDUCTOR YBa2Cu3O7 AND Gdna2Cu3O7.
- 5.1. Introduction.
- 5.2. Pressure derivatives of the second order elastic constants from third order elastic constants data.
- 5.3. Pressure derivatives of the second order elastic constants of YBa2Cu3O7 and GdBa2Cu3O7.
- 5.4. Results and discussion.
- Table 5.1 Pressure derivatives of second order elastic constantsof high temperature superconducting compound YBa Cu 0. 2 3 7
- Table 5.2 Pressure derivatives of second order elastic constnnt~of h ~ g h temperature superconducting compound GdRa Cu 0. 2 3 7
- Reference
- VI. LOW TEMPERATURE THERMAL EXPANSION OF YBa2Cu3O7 AND GdBa2Cu3O7.
- 6.1. Introduction.
- 6.2. Introduction to finite strain elasticity theory and calculation of the generalized gruneisen parameters for acoustic waves in orthorhombic crystals from third order elastic constants.
- 6.3. Low temperature thermal expansion of YBa2Cu3O7
- Fig. 6.1 GPs FOR THE THREE ACOUSTIC BRANCHESAS A FUNCTION OP ANGLE FOR YBa2Cu3O7.
- Fig. 6.2 GPs FOR THE THREE ACOUSTIC BRANCHESAS A FUNCTION OF ANGLE FOR YBa2Cu307.
- Fig. 6.3. POLAR DIAGRAM SHOWING THE PLOT OF THE GPS AND rsFOR THE ACOUSTIC BRANCHES AS A FUNCTION OF THE ANGLE WHICHTHE DIRECTION OF PROPAGATION MAKES W I T 6 THE ORTHORHOMBIC AXISFOR YBa2Cu307-
- Fig. 6.4. POLAR DIAGRAM SHOWING THE PLOT OF THE GPs FOR THE ACOUSTIC BRANCH AS A FUNCTION OF THE ANGLE WHICH THE DIRECTION OF PROPAGATION MAKES WITH THE ORTHORBOMBIC AXIS FOR YBa2Cu3o7
- Fig. 6.5. POLAR DIAGRAM SHOWING THE PLOT OF THE GPS r, FOR THE ACOUSTIC BRANCH AS A FUNCTION OF THE ANGLE WHICH THEDIRECTION OF PROPAGATION MAKES WITH THE ORTHORAOMBIC AXISFOR YBa2C?0,.
- Fig. 6.6. POLAR DIAGRAM SHOWING THE PLOT OF THE GPs r, AND r2 FOR THE ACOUSTIC BRANCHES AS A FUNCTION OF THE ANGLE WHICH THE DIRECTION OF THE PROPAGATION MAKES WITH THE ORTHOBOMBIC AXIS FOR YBa2Cu3O7
- 6.4. Low temperature thermal expansion of GdBa2Cu307
- Fig. 6.7. GPO r FOR TRE TRREK ACOUgRC BRANCRWAS A FUNCTION OF ANGLE FOR C d ~ C u 3 0
- Fig. 6.8 GPs r FOR THE THREE ACOUSTIC BRANCHESAS A FUNCTION OP ANGLE FOR GdBa2Cu3O7
- Fig. 6.9. POLAR DUCRAIl SROWMG TEE PLOT OF TALI GPs f4 AND 7; OR THE Acommc BRANCRW AS A r m c n o N or r n A~NG LE WRICATHE DIRECTION Or PROPAGATION MAKES WITH TRI! ORTAORflOIlBIC AXISroll Gd~ClL, O7-
- Fig. 6.10. POLAR DIAGRAH SAOWMG THE PLOT OF THE GPs yrFOR THE ACOUSTIC BRANCH AS A FUNCTION OF THE ANGLE WAICA TIDIRECTION OF PROPAGATION MAKES WITH TEE ORTAORAOMBIC AXISFOR GdBa2Cu307.
- Fig. 6.11. POLAR DIAGRAM SHOWING THE PLOT OF THE G P s NFOR THE ACOUSTIC BRANcHx AS A FUNCTION OF THE ANGLE WHICH %HEDIRECTION OF PROPAGATION UAKES WITH THE ORTHORAOMBIC AXISFOR GdBa2Cu30,.
- Fig. 6.U. POLAR DIAGRAM SHOWING TIIE PC., OF F I E GPO rs AND FOR THE AcOaSnC BRANCHES AS A FUNCTION OF TEE ANGLE *HXCnTHE DIRECTION OF PROPAGATION MAKW WITH TFIE ORTROREOMBIC AX=FOR GdBa2CU, 0,.
- 6.5. Results and discussions.
- References.