# Resonant Charging # Resonant Charging Principle Resonant charging is a technique where energy is transferred to a capacitive load (the WFC) in a controlled, oscillatory manner. Unlike direct DC charging, resonant charging can achieve higher efficiency and allows voltage magnification beyond the source voltage. ## Conventional vs. Resonant Charging
AspectDC Charging (R-C)Resonant Charging (L-C)
Final voltage= VsourceCan exceed Vsource (up to 2× for half-wave)
Energy efficiency50% max (half lost in R)Can approach 100% (minimal loss in L)
Charging curveExponential (slow)Sinusoidal (faster)
Peak currentV/R at startV/Z₀ (controlled by L)
## Basic Resonant Charging Circuit ``` Switch (S) ────○/○────┬───────────────┬──── │ │ V_source │ │ + │ ┌─────┐ ─┴─ │ │ L │ ─┬─ C (WFC) │ └──┬──┘ │ │ │ │ ───────────┴───────┴───────┴──── GND When S closes: 1. Current builds in L (energy stored in magnetic field) 2. Current flows into C, charging it 3. Voltage on C rises 4. At peak voltage, current reverses (or S opens) ``` ## Half-Cycle Resonant Charging In half-cycle mode, the switch opens when capacitor voltage reaches maximum: #### Ideal Half-Cycle Charging (lossless): VC,max = 2 × Vsource #### Charging Time: tcharge = π√(LC) = π/ω₀ = 1/(2f₀) This is exactly half the resonant period. ### Why 2× Voltage? **Energy Conservation:**
1. Initially: All energy in source (voltage Vs) 2. Quarter cycle: Energy split between L (current max) and C (V = Vs) 3. Half cycle: All energy in C, current = 0 4. For energy to be conserved: ½CVc² = C×Vs² (accounting for work done by source) 5. This gives Vc = 2Vs
## Resonant Charging with Losses Real circuits have losses that reduce the voltage gain: #### With Resistance (damped case): VC,max = Vsource × (1 + e-πR/(2√(L/C))) VC,max = Vsource × (1 + e-π/(2Q)) #### Approximation for high Q: VC,max ≈ 2Vsource × (1 - π/(4Q)) ### Voltage Gain vs. Q Factor
Q FactorVC,max/VsourceEfficiency
∞ (ideal)2.00100%
1001.9898.4%
501.9796.9%
201.9292.5%
101.8585.5%
51.7373%
## Continuous Resonant Excitation In the VIC, instead of single pulses, we drive the circuit continuously at the resonant frequency: #### Steady-State Resonance: Energy from the source compensates for losses each cycle, maintaining a steady oscillation amplitude. #### Voltage Magnification: VC = Q × Vsource This is much greater than the 2× from single-pulse resonant charging when Q > 2. ## Resonant Charging in VIC Context The VIC uses resonant charging principles in several ways: 1. **Primary tank:** C1 is resonantly charged through L1 2. **Secondary transfer:** Energy transfers resonantly to WFC through L2 3. **Cumulative effect:** Multiple stages multiply the magnification ## Timing and Switching For optimal resonant charging: #### Critical Timing Points:
- **Turn-on:** When capacitor voltage is minimum (or at desired starting point) - **Turn-off:** When current through inductor reaches zero (zero-current switching) - **Period:** Should match or be a harmonic of the resonant frequency
#### Zero-Current Switching (ZCS): Turning off when current is zero minimizes switching losses and eliminates inductive kick. ## Energy Flow Analysis ``` Time → V_C: ────╱╲ ╱╲ ╱╲ ╱╲──── ╱ ╲ ╱ ╲ ╱ ╲ ╱ ╲ ╱ ╲╱ ╲╱ ╲╱ ╲ I_L: ──╱╲ ╱╲ ╱╲ ╱╲──── ╱ ╲ ╱ ╲ ╱ ╲ ╱ ╲ ╱ ╲╱ ╲╱ ╲╱ ╲ Energy in C: High → Low → High → Low Energy in L: Low → High → Low → High Total energy (minus losses) remains constant in steady state. ``` ## Advantages of Resonant Charging for WFC - **High voltage:** Achieves voltages beyond source capability - **Low current draw:** Source only provides loss compensation - **Controlled energy delivery:** Sinusoidal rather than impulsive - **Efficient:** Minimal resistive losses when Q is high - **Self-limiting:** Voltage limited by Q factor, not infinite **Key Principle:** Resonant charging exploits the energy storage capability of inductors and capacitors. By timing the energy injection to match the natural oscillation, we can build up substantial energy in the circuit with modest input power—the same principle used in pushing a swing at just the right moment. *Next: Step-Charging Ladder Effect →*